Question

The area of a rhombus is 120 cm2 and one of its diagonals is 16 cm. Find the length of the other diagonal.​

Answer 1

Answer:

area of rhombus= product of 2 diagonals by 2

Step-by-step explanation:

120= d1X16÷2

=>240=d1X16

=>240÷16=d1

=>15=d1

therefore length of the other ddiagonal is 15cm

Answer 2

Step-by-step explanation:

Question :-

• The area of a rhombus is 120 cm² and one of its diagonals is 16 cm. Find the length of the other diagonal.

To Find :-

• Diagonal of rhombus.

Solution :-

Given :

• Area = 120 cm²
• Diagonal (1) = 16 cm

By using the formula,

${\sf{\longrightarrow Area\ of\ rhombus\ =\ \dfrac{1}{2} \times d_1 \times d_2}}$

Where,

• d = length of the diagonals

According to the question, by using the formula, we get :

${\sf{\longrightarrow Area\ of\ rhombus\ =\ \dfrac{1}{2} \times d_1 \times d_2}}$

${\sf{\longrightarrow 120\ =\ \dfrac{1}{\cancel2} \times \cancel{16} \times d_2}}$

${\sf{\longrightarrow 120\ =\ 8 \times d_2}}$

${\sf{\longrightarrow \dfrac{120}{8}\ =\ d_2}}$

${\sf{\longrightarrow 15\ =\ d_2}}$

${\sf{\longrightarrow d_2\ =\ 15\ cm}}$

$\therefore$ Hence, diagonal of rhombus is 15 cm.

More To Know :-

$\begin{gathered}\boxed{\begin {minipage}{9cm}\\ \dag\quad \Large\underline{\bf Formulas\:of\:Areas:-}\\ \\ \star\sf Square=(side)^2\\ \\ \star\sf Rectangle=Length\times Breadth \\\\ \star\sf Triangle=\dfrac{1}{2}\times Breadth\times Height \\\\ \star \sf Scalene\triangle=\sqrt {s (s-a)(s-b)(s-c)}\\ \\ \star \sf Rhombus =\dfrac {1}{2}\times d_1\times d_2 \\\\ \star\sf Rhombus =\:\dfrac {1}{2}p\sqrt {4a^2-p^2}\\ \\ \star\sf Parallelogram =Breadth\times Height\\\\ \star\sf Trapezium =\dfrac {1}{2}(a+b)\times Height \\ \\ \star\sf Equilateral\:Triangle=\dfrac {\sqrt{3}}{4}(side)^2\end {minipage}}\end{gathered}$